Difference between revisions of "Recap of Chapter 25-28"

Electric Currents and Resistance

Units
Current	1 A = 1 C/s
Potential difference	1V = 1 J/C
Power	1 W = 1J/s
Resistance	1 ${\displaystyle \Omega }$ = 1 V/A

• An electric battery serves as a source of nearly constant potential difference.
• Electric current, ${\displaystyle I}$, refers to the rate of flow of electric charge and is measured in amperes (A): 1 A equals a flow of 1 C/s past a given point.
• The direction of conventional current is that of positive charge flow. In a wire, it is actually negatively charged electrons that move, so they flow in a direction opposite to the conventional current.
• Positive conventional current always flows from a high potential to a low potential.
• The resistance ${\displaystyle R}$ of a device is defined through the Ohm’s law

 ${\displaystyle V=IR}$

• The current ${\displaystyle I}$ coming from a battery of voltage ${\displaystyle V}$ depends on the resistance ${\displaystyle R}$ of the circuit connected to it.
• The resistance ${\displaystyle R}$ of a wire is inversely proportional to its cross-sectional area ${\displaystyle A}$, and directly proportional to its length ${\displaystyle l}$ and to a property of the material called its resistivity ${\displaystyle \rho }$.

  ${\displaystyle R={\frac {\rho l}{A}}}$

• Resistivity depends on temperature.
• The rate at which energy is transformed in a resistance R from electric to other forms of energy (such as heat and light) is equal to the product of current and voltage.

  ${\displaystyle P=IV}$ 

• For Ohmic resistors, Power can also be written as

  ${\displaystyle P=I^{2}R={\frac {V^{2}}{R}}}$

• SI Unit of power is Watts (W)
• The total electric energy transformed in any device is equals the product of the power and the time during which the device is operated. In SI units, energy is given in joules (1 J = 1 W . s), but electric companies use a larger unit, the kilowatt-hour. (1kWh = ${\displaystyle 3.6\times 10^{-6}}$ J).
• Electric current can be direct current (dc), in which the current is steady in one direction; or it can be alternating current (ac), in which the current reverses direction at a particular frequency ${\displaystyle f}$

 ${\displaystyle I=I_{0}\sin \omega t}$

where ${\displaystyle \omega =2\pi f}$

• The rms values of sinusoidally alternating currents and voltages are

 ${\displaystyle I_{\textrm {rms}}={\frac {I_{0}}{\sqrt {2}}}}$ and ${\displaystyle V_{\textrm {rms}}={\frac {V_{0}}{\sqrt {2}}}}$

• The peakvalues of the current and voltage are ${\displaystyle I_{0}}$ and ${\displaystyle V_{0}}$
• The power relationship, ${\displaystyle P=IV=I^{2}R={\frac {V^{2}}{R}}}$, is valid for the average power in alternating currents when the rms values of V and I are used.
• Current density ${\displaystyle {\vec {j}}}$ is the current per cross-sectional area.
• From a microscopic point of view, the current density is related to the number of charge carriers per unit volume, ${\displaystyle n}$, their charge, ${\displaystyle q}$, and their drift velocity, ${\displaystyle {\vec {v}}_{d}}$ , by

  ${\displaystyle {\vec {j}}=nq{\vec {v}}_{d}}$

• conductivity ${\displaystyle \sigma }$ is the inverse of resistivity

${\displaystyle \sigma ={\frac {1}{\rho }}}$

• The electric field within a wire is related to ${\displaystyle {\vec {j}}}$

${\displaystyle {\vec {j}}=\sigma {\vec {E}}}$